Finite Dimensional Chebyshev Subspaces of Banach Spaces

A Chebyshev set is a subset of a normed linear space that admits unique best approximations. In 1853 the Russian mathematician Chebyshev asked the question: can we represent any continuous function defined on [ab] by a polynomial of degree at most n in such a way that the maximum error at any point in [ab] is controlled? Since then the mathematicians have searched : why such a polynomial should exist? If it does can we hope to construct it? If it exists is it also unique? What happens if we change the measure of error? The aim of this book is to study finite dimensional Chebyshev subspaces of all classical Banach Spaces. In addition you can find a valuable review for extreme points which are not found in books or articles. The main topics that are included in this book: Normed linear and Banach spaces convexity bounded linear operators Hilbert spaces topological vector spaces Hahn-Banach theorems reflexivity w-topology and w*-topology extreme points and sets best approximation and proximinal sets Chebyshev subspaces metric projection uniqueness and Characterization of best approximation existence of Chebyshev subspaces and Chebyshev Subspaces of C[a b].